sewma.q: Compute RL quantiles of EWMA (variance charts) control charts
In spc: Statistical Process Control -- Calculation of ARL and Other Control Chart Performance Measures
sewma.q R Documentation
Compute RL quantiles of EWMA (variance charts) control charts
Description
Computation of quantiles of the Run Length (RL)
for EWMA control charts monitoring normal variance.
Usage
sewma.q(l, cl, cu, sigma, df, alpha, hs=1, sided="upper", r=40, qm=30)
sewma.q.crit(l,L0,alpha,df,sigma0=1,cl=NULL,cu=NULL,hs=1,sided="upper",
mode="fixed",ur=4,r=40,qm=30,c.error=1e-12,a.error=1e-9)
Arguments
l
smoothing parameter lambda of the EWMA control chart.
cl
deployed for sided="Rupper", that is, upper variance control
chart with lower reflecting barrier cl.
cu
for two-sided (sided="two") and fixed upper control limit
(mode="fixed") a value larger than sigma0
has to been given, for all other cases cu is ignored.
sigma,sigma0
true and in-control standard deviation, respectively.
df
actual degrees of freedom, corresponds to subgroup size (for known mean it
is equal to the subgroup size,
for unknown mean it is equal to subgroup size minus one.
alpha
quantile level.
hs
so-called headstart (enables fast initial response).
sided
distinguishes between one- and two-sided two-sided EWMA-S^2
control charts by choosing "upper" (upper chart
without reflection at cl – the actual value of cl is not used), "Rupper"
(upper chart with reflection at cl),
"Rlower" (lower chart with reflection at cu),and "two"
(two-sided chart), respectively.
mode
only deployed for sided="two" – with "fixed" an upper
control limit (see cu) is set and only the lower is
calculated to obtain the in-control ARL L0, while with "unbiased" a
certain unbiasedness of the ARL function is guaranteed (here, both the
lower and the upper control limit are calculated).
ur
truncation of lower chart for classic mode.
r
dimension of the resulting linear equation system (highest order of the
collocation polynomials).
qm
number of quadrature nodes for calculating the collocation definite integrals.
L0
in-control quantile value.
c.error
error bound for two succeeding values of the critical value during
applying the secant rule.
a.error
error bound for the quantile level alpha
during applying the secant rule.
Details
Instead of the popular ARL (Average Run Length) quantiles of the EWMA
stopping time (Run Length) are determined. The algorithm is based on
Waldmann's survival function iteration procedure.
Thereby the ideas presented in Knoth (2007) are used.
sewma.q.crit determines the critical values (similar to alarm limits)
for given in-control RL quantile L0 at level alpha by applying
secant rule and using sewma.sf().
In case of sided="two" and mode="unbiased" a two-dimensional
secant rule is applied that also ensures that the
minimum of the cdf for given standard deviation is attained at sigma0.
Value
Returns a single value which resembles the RL quantile of order alpha and
the lower and upper control limit cl and cu, respectively.
Author(s)
Sven Knoth
References
H.-J. Mittag and D. Stemann and B. Tewes (1998),
EWMA-Karten zur \"Uberwachung der Streuung von Qualit\"atsmerkmalen,
Allgemeines Statistisches Archiv 82, 327-338,
C. A. Acosta-Mej\'ia and J. J. Pignatiello Jr. and B. V. Rao (1999),
A comparison of control charting procedures for monitoring process dispersion,
IIE Transactions 31, 569-579.
S. Knoth (2005),
Accurate ARL computation for EWMA-S^2 control charts,
Statistics and Computing 15, 341-352.
S. Knoth (2007),
Accurate ARL calculation for EWMA control charts monitoring simultaneously normal mean and variance,
Sequential Analysis 26, 251-264.
S. Knoth (2010),
Control Charting Normal Variance – Reflections, Curiosities, and Recommendations,
in Frontiers in Statistical Quality Control 9,
H.-J. Lenz and P.-T. Wilrich (Eds.),
Physica Verlag, Heidelberg, Germany, 3-18.
K.-H. Waldmann (1986),
Bounds for the distribution of the run length of geometric moving
average charts, Appl. Statist. 35, 151-158.
See Also
sewma.arl for calculation of ARL of variance charts and
sewma.sf for the RL survival function.
Examples
## will follow
spc documentation built on Oct. 24, 2022, 5:07 p.m.
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| sewma.q | R Documentation |
Compute RL quantiles of EWMA (variance charts) control charts
Description
Computation of quantiles of the Run Length (RL) for EWMA control charts monitoring normal variance.
Usage
sewma.q(l, cl, cu, sigma, df, alpha, hs=1, sided="upper", r=40, qm=30) sewma.q.crit(l,L0,alpha,df,sigma0=1,cl=NULL,cu=NULL,hs=1,sided="upper", mode="fixed",ur=4,r=40,qm=30,c.error=1e-12,a.error=1e-9)
Arguments
l |
smoothing parameter lambda of the EWMA control chart. |
cl |
deployed for |
cu |
for two-sided ( |
sigma,sigma0 |
true and in-control standard deviation, respectively. |
df |
actual degrees of freedom, corresponds to subgroup size (for known mean it is equal to the subgroup size, for unknown mean it is equal to subgroup size minus one. |
alpha |
quantile level. |
hs |
so-called headstart (enables fast initial response). |
sided |
distinguishes between one- and two-sided two-sided EWMA-S^2
control charts by choosing |
mode |
only deployed for |
ur |
truncation of lower chart for |
r |
dimension of the resulting linear equation system (highest order of the collocation polynomials). |
qm |
number of quadrature nodes for calculating the collocation definite integrals. |
L0 |
in-control quantile value. |
c.error |
error bound for two succeeding values of the critical value during applying the secant rule. |
a.error |
error bound for the quantile level |
Details
Instead of the popular ARL (Average Run Length) quantiles of the EWMA
stopping time (Run Length) are determined. The algorithm is based on
Waldmann's survival function iteration procedure.
Thereby the ideas presented in Knoth (2007) are used.
sewma.q.crit determines the critical values (similar to alarm limits)
for given in-control RL quantile L0 at level alpha by applying
secant rule and using sewma.sf().
In case of sided="two" and mode="unbiased" a two-dimensional
secant rule is applied that also ensures that the
minimum of the cdf for given standard deviation is attained at sigma0.
Value
Returns a single value which resembles the RL quantile of order alpha and
the lower and upper control limit cl and cu, respectively.
Author(s)
Sven Knoth
References
H.-J. Mittag and D. Stemann and B. Tewes (1998), EWMA-Karten zur \"Uberwachung der Streuung von Qualit\"atsmerkmalen, Allgemeines Statistisches Archiv 82, 327-338,
C. A. Acosta-Mej\'ia and J. J. Pignatiello Jr. and B. V. Rao (1999), A comparison of control charting procedures for monitoring process dispersion, IIE Transactions 31, 569-579.
S. Knoth (2005), Accurate ARL computation for EWMA-S^2 control charts, Statistics and Computing 15, 341-352.
S. Knoth (2007), Accurate ARL calculation for EWMA control charts monitoring simultaneously normal mean and variance, Sequential Analysis 26, 251-264.
S. Knoth (2010), Control Charting Normal Variance – Reflections, Curiosities, and Recommendations, in Frontiers in Statistical Quality Control 9, H.-J. Lenz and P.-T. Wilrich (Eds.), Physica Verlag, Heidelberg, Germany, 3-18.
K.-H. Waldmann (1986), Bounds for the distribution of the run length of geometric moving average charts, Appl. Statist. 35, 151-158.
See Also
sewma.arl for calculation of ARL of variance charts and
sewma.sf for the RL survival function.
Examples
## will follow
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